Accessible Parts of Boundary for Simply Connected Domains

Abstract

For a bounded simply connected domain ⊂R2, any point z∈ and any 0<α<1, we give a lower bound for the α-dimensional Hausdorff content of the set of points in the boundary of which can be joined to z by a John curve with a suitable John constant depending only on α, in terms of the distance of z to ∂. In fact this set in the boundary contains the intersection ∂z∂ of the boundary of a John sub-domain z of , centered at z, with the boundary of . This may be understood as a quantitative version of a result of Makarov. This estimate is then applied to obtain the pointwise version of a weighted Hardy inequality.